Temperedness of L2( G) and positive eigenfunctions in higher rank

Abstract

Let G=SO(n,1) × SO(n,1) and X= Hn× Hn for n 2. For a pair (π1, π2) of non-elementary convex cocompact representations of a finitely generated group into SO(n,1), let =(π1× π2)(). Denoting the bottom of the L2-spectrum of the negative Laplacian on X by λ0, we show: (1) L2( G) is tempered and λ0=12(n-1)2; (2) There exists no positive Laplace eigenfunction in L2( X). In fact, analogues of (1)-(2) hold for any Anosov subgroup in the product of at least two simple algebraic groups of rank one as well as for Hitchin subgroups <PSLd( R), d 3. Moreover, if G is a semisimple real algebraic group of rank at least 2, then (2) holds for any Anosov subgroup of G.